I'm creating an iterative algorithm (Monte Carlo method). The algorithm returns a value on every iteration, creating a stream of values.

I need to analyze these values and stop the algorithm when say `1000`

returned values are withing some `epsilon`

.

I decided to implement it calculation the `max`

and `min`

values of the last `1000`

values, and then calculate the `error`

using this formula `(max-min)/min`

and compare it to `epsilon`

: `error<=epsilon`

. And if this condition is reached, stop the iterations and return the result.

The first hare-brained idea was to use a

`list`

and`append`

new values to it, calculating the`max`

and`min`

values for the last`1000`

values of it after each appending.Then I decided there is no use of keeping more that

`1000`

last values. So I remembered of`deque`

. It was a very good idea since the complexity on adding and deleting on both ends of`deque`

object is`O(1)`

. But it didn't solve the problem of needing to go through all the last 1000 values on each iteration to calculate`min`

and`max`

.Then I remembered there is the

`heapq`

module. It keeps the data in such a way as to efficiently return the smallest one at every moment. But I need both the smallest and the largest ones. Furthermore I need to preserve the order of the elements so that I can keep`1000`

last returned elements of the algorithm, and I don't see how I can achieve it with`heapq`

.

Having all those thoughts in mind I decided to ask here:

How can I solve this task the most efficiently?